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4.3 1st & 2nd Derivative Tests

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Presentation on theme: "4.3 1st & 2nd Derivative Tests"— Presentation transcript:

1 4.3 1st & 2nd Derivative Tests

2 Increasing or Decreasing?:
If f  (x) > 0 in an interval, then f is increasing in the interval. If f  (x) < 0 in an interval, then f is decreasing in the interval.

3 1st Derivative Test c is critical number of f: If f  changes from + to – at c, then f(c) is a local max. If f  changes from – to + at c, then f(c) is a local min.

4 Concave Up or Down?: Concave up: holds water an Increasing rate a Decreasing rate

5 Concave Up or Down?: Concave down: spills water an Decreasing rate a Increasing rate

6 Concavity Test f(x) > 0 in an interval, then f is concave up in the interval. f(x) < 0 in an interval, then f is concave down in the interval.

7

8 Increasing or Decreasing?:
If f  (x) > 0 in an interval, then f is increasing in the interval. If f  (x) < 0 in an interval, then f is decreasing in the interval.

9 1st Derivative Test c is critical number of f: If f  changes from + to – at c, then f(c) is a local max. If f  changes from – to + at c, then f(c) is a local min.

10 Concave Up or Down?: Concave up: holds water an Increasing rate a Decreasing rate

11 Concave Up or Down?: Concave down: spills water an Decreasing rate a Increasing rate

12 Concavity Test f(x) > 0 in an interval, then f is concave up in the interval. f(x) < 0 in an interval, then f is concave down in the interval.

13

14 2nd Derivative Test c is critical number of f: If f (c) = 0 & f(c) > 0, then f(c) is a local min. If f (c) = 0 & f(c) < 0, then f(c) is a local max.

15 HW – 4.3 pg , 5 – 10 all, 25 – 49 EOO

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